Non-Rational Conformal Field Theory

非有理共形场论

• 批准号: RGPIN-2014-03602
• 负责人: Creutzig, Thomas
• 金额: $ 2.99万
• 依托单位: University of Alberta
• 依托单位国家: 加拿大
• 项目类别: Discovery Grants Program - Individual
• 财政年份: 2019
• 资助国家: 加拿大
• 起止时间: 2019-01-01 至 2020-12-31
• 项目状态: 已结题
• 来源: https://www.nserc-crsng.gc.ca/ase-oro/Details-Detailles_eng.asp?id=688324
• 关键词: Non; Rational; Conformal; Field; Theory

Due to its infinite dimensional symmetry algebra, two-dimensional conformal field theory (CFT) provides a class of very accessible quantum field theories. Rational CFTs have proven to be extremely useful in mathematics, string theory and statistical physics. An important example being the monster moonshine relating finite simple groups, modular forms, infinite dimensional Lie algebras, conformal field theory and the bosonic string to each other. By now the modern belief is that the fundamental class of nice CFTs is much larger than only rational theories. Indeed, non-rational CFT also appears in all areas just mentioned and it connects very recent and modern developments. One example is the Mathieu moonshine connecting finite simple groups, super string theory, (mock) modular forms and geometry of K3 surfaces. Another example is percolation relating logarithmic CFT to Schramm Loewner Evolution. **Integer level WZW theories of Lie groups and their cosets provide the natural family of rational conformal field theory. Logarithmic CFTs are non-rational and they are far less explored than their rational cousins. The natural families of logarithmic theories I expect to be fractional admissible level WZW theories and their cosets. **It has been a long-standing open problem (since 1988) to understand fractional level WZW theories. Together with David Ridout a consistent and satisfactory description has recently been found for the case of the fractional level SL(2) WZW theory. This finally opens the door to study these CFTs in great detail, and surely new and interesting structures will be found. My goal is to explore fractional level WZW theories and their cosets, and the objectives towards this goal are:**1) Describe the symmetry super algebra of a general class of cosets of super group WZW theories. Establish isomorphisms between examples of these cosets and very different looking CFTs. I.e. CFTs that are characterized as joint kernel of screening charges inside a free theory and also quantum Hamiltonian reductions. **2) There are interesting modular-like objects appearing as characters of logarithmic CFTs. In the second objective I will consider examples of cosets of logarithmic CFTs. The task is to understand how to get coset characters (branching functions) from the parent theory as well as the inverse problem, that is using the branching functions to reconstruct characters of the parent theory. **3) The aim of the final objective is to understand the fractional super group WZW theories of OSP(1|2) and SL(2|1). Important steps will be finding all irreducible modules with bounded conformal dimension as well as using the ideas of objective two to reconstruct the WZW theory from its cosets. This objective contains many feasible problems with interesting outcome and I want to train highly qualified personal (HQP, i.e. graduate students and postdocs) in this area. Especially graduate students can gain valuable experience in logarithmic CFT as well as modularity and representation theory in working on this objective. **The first two objectives are outlined in detail in the proposal section, while the third one is described in the section on highly qualified personal. I also have ambitious long-term goals. Proving the Verlinde formula for a class of logarithmic CFTs would be spectacular. In the rational case, the general proof by Huang was given more than ten years after Falting's geometric proof in the WZW case. In other words, an important step towards a proof of the Verlinde formula for fractional level WZW theories is to understand their geometric interpretation. Here at the University of Alberta, there are with Terry Gannon and Emanuel Diaconescu colleagues with the ideal background to ask this question together.

由于它的无限维对称代数，二维共形场理论(CFT)提供了一类非常容易理解的量子场论。有理CFT已被证明在数学、弦论和统计物理中非常有用。一个重要的例子是将有限单群、模形式、无限维李代数、保形场论和玻色弦联系在一起的怪物月光。到目前为止，现代的信念是，优秀的CFT的基本类别远远超过了理性理论。事实上，非理性CFT也出现在刚才提到的所有领域，它将非常新的和现代的发展联系在一起。一个例子是连接有限单群、超弦理论、(模拟)模形式和K3曲面几何的Mathieu Moonlight。另一个例子是将对数CFT与Schramm Loewner演化联系起来的渗流。**李群及其陪集的整数水平WZW理论提供了有理保形场论的自然族。对数CFT是非理性的，与它们的理性表亲相比，它们受到的探索要少得多。我期望对数理论的自然族是分数可容许水平的WZW理论及其陪集。**对分数级WZW理论的理解(自1988年以来)一直是一个悬而未决的问题。最近，与David Ridout一起，对分数能级SL(2)WZW理论的情形找到了一致且令人满意的描述。这最终打开了详细研究这些CFT的大门，肯定会发现新的有趣的结构。我的目标是探索分数阶WZW理论及其陪集，目标是：**1)描述超群WZW理论的一类一般陪集的对称超代数。在这些陪集的例子和看起来非常不同的CFT之间建立同构。也就是说，cFTS被描述为自由理论中屏蔽电荷的联合核以及量子哈密顿约化。**2)有一些有趣的模状物体作为对数CFT的特征出现。在第二个目标中，我将考虑对数CFT陪集的例子。我们的任务是了解如何从母体理论中获得陪集特征(分支函数)以及反问题，即使用分支函数来重构母体理论的特征。**3)最终目的是理解OSP(1|2)和SL(2|1)的分数超群WZW理论。重要的步骤是找出所有具有有界共形维度的不可约模，以及使用目标二的思想从陪集重建WZW理论。这个目标包含了许多可行的问题和有趣的结果，我想在这个领域培养高素质的个人(HQP，即研究生和博士后)。特别是研究生可以在对数CFT以及模数性和表示理论方面获得宝贵的经验。**前两个目标在建议书部分详细概述，而第三个目标在高素质个人部分描述。我也有雄心勃勃的长期目标。证明一类对数CFT的Verlinde公式将是壮观的。在有理情形下，黄的一般证明是在福尔廷在WZW案中的几何证明之后十多年才给出的。换句话说，要证明分数能级WZW理论的Verlinde公式，重要的一步是理解它们的几何解释。在艾伯塔大学，有特里·甘农和伊曼纽尔·迪亚科内斯库的同事，他们有着理想的背景，可以一起提出这个问题。